exponential functions Write an equation for each statement. a)The initial population is 279. The population grows...

Revisiting Exponential Growth At time t = 0 a population has size 1000. Suppose it grows...

Revisiting Exponential Growth At time t = 0 a population has size 1000. Suppose it grows exponentially, so that at time t (years) it has size S(t) = 1000a t for some a and all t > 0. a) Suppose that it doubles in size every 8 years. What is a? b) After how many years is the population 32 000? c) What is its instantaneous growth rate (individuals per year) at t = 10? d) What is its instantaneous...

1. A population grows according to an exponential growth model. The initial population is P0=12, and...

1. A population grows according to an exponential growth model. The initial population is P0=12, and the common ratio is r=1.45 Then: P1 = P2 = Find an explicit formula for Pn. Your formula should involve n. Pn =    Use your formula to find P9 P9= Give all answers accurate to at least one decimal place 2. Assume there is a certain population of fish in a pond whose growth is described by the logistic equation. It is estimated that...

The population of Toledo, Ohio, in the year 2000 was approximately 490,000. Assume the population is...

The population of Toledo, Ohio, in the year 2000 was approximately 490,000. Assume the population is increasing at a rate of 4.6 % per year. a. Write the exponential function that relates the total population, P (t), as a function of t, the number of years since 2000. P(t) = b. Use part a. to determine the rate at which the population is increasing in t years. Use exact expressions. P '(t) = people per year c. Use part b....

Two cities each have a population of 1.2 million people. City A is growing by a...

Two cities each have a population of 1.2 million people. City A is growing by a factor of 1.13 every 10 years, while city B is decaying by a factor of 0.84 every 10 years. a. Write an exponential function for each city′s population and after t years. PA(t) = Edit millions PB(t) = Edit millions b. Generate a table of values for t = 0 to t = 50, using 10-year intervals, then sketch a graph of each town's...

Suppose an initial population of 33 million people increases at a continuous percent rate of 1.8%...

Suppose an initial population of 33 million people increases at a continuous percent rate of 1.8% per year since the beginning of 2000. Write a function ff that determines the population (in millions) in terms of the number of years tt since the beginning of 2000. f(t)=f(t)=    Determine the population (in millions) at the beginning of 2019. million people    What is the annual growth factor for the population?     If aa represents the population (in millions) at some point in...

A town has a population of 1300 people at time t=0. In each of the following...

A town has a population of 1300 people at time t=0. In each of the following cases, write a formula for the population P, of the town as a function of year t. (a) The population increases by 80 people per year. (b) The population increases by 7 percent a year.

Suppose the population of a town was 40,000 on January 1, 2010 and was 50,000 on...

Suppose the population of a town was 40,000 on January 1, 2010 and was 50,000 on January 1, 2015. Let P(t) be the population of the town in thousands of people t years after January 1, 2010. (a) Build an exponential model (in the form P(t) = a*bt ) that relates P(t) and t. Round the value of b to 5 significant figures. (b) Write the exponential model in the form P(t) = a*ekt. According to this model, what is...

A town's population has been increasing. In 2001 the population was 38000 people. By 2011 the...

A town's population has been increasing. In 2001 the population was 38000 people. By 2011 the population had grown to 45000 . A write an equation that models this situation. Let p(t)=mt +b be the form . B) how many people will be living in the town by 2018? C) when will the population reach 100000 people at this rate? Round to the nearest year?

(1 point) Suppose P=f(t)P=f(t) is the population (in thousands) of town tt years after 1990, and...

(1 point) Suppose P=f(t)P=f(t) is the population (in thousands) of town tt years after 1990, and that f(4)=14f(4)=14 and f(12)=21f(12)=21, (a) Find a formula for f(t)f(t) assuming ff is exponential: P=f(t)=P=f(t)= (b) Find a formula for f−1(P)=f−1(P)= (c) Evaluate f(30)=f(30)=  (Round your answer to the nearest whole number.) (d) f−1(30)=f−1(30)=  (Round your answer to at least one decimal place.) Write out sentences to explain the practical meaning of your answers to parts (c) and (d). Consider the seven numbered statements in the...

(a) Write the equation in slope-intercept form. y = −(x − 5) (b) Write the equation...

(a) Write the equation in slope-intercept form. y = −(x − 5) (b) Write the equation in slope-intercept form. y + 2x = 6 A restaurant serves 80 customers per hour. (a) Write an equation that relates the number of customers C and time t. Use the slope and y-intercept to sketch the graph of each equation. (a)     y = 3x + 2 Identify the x-intercept. b)     y = − 1/5x Identify the x-intercept. (c)     y = 3/2x-6 Identify the...